Detail publikace

The classes of mutual comaptificability

KOVÁR, M.

Originální název

The classes of mutual comaptificability

Anglický název

The classes of mutual comaptificability

Jazyk

en

Originální abstrakt

Two topological spaces X, Y are mutually compacificable if there exists a compact topology on their disjoint union K in which the original topologies are induced from K and every two points, one from X and the other from Y, have disjoint neighborhoods. We introduce the classes of mutual compacitficability. Two topological spaces are of the same class if their behavior with respect mutual compactificability (i.e. the abilty to form the space K with any Y) is same.

Anglický abstrakt

Two topological spaces X, Y are mutually compacificable if there exists a compact topology on their disjoint union K in which the original topologies are induced from K and every two points, one from X and the other from Y, have disjoint neighborhoods. We introduce the classes of mutual compacitficability. Two topological spaces are of the same class if their behavior with respect mutual compactificability (i.e. the abilty to form the space K with any Y) is same.

Dokumenty

BibTex


@article{BUT48317,
  author="Martin {Kovár}",
  title="The classes of mutual comaptificability",
  annote="Two topological spaces X, Y are mutually compacificable if there exists a compact topology on their disjoint union K in which the original topologies are induced from K and every two points, one from X and the other from Y,  have disjoint neighborhoods. We introduce the classes of mutual compacitficability. Two topological spaces are of the same class if their behavior with respect mutual compactificability (i.e. the abilty to form the space K with any Y) is same.",
  chapter="48317",
  journal="International Journal of Mathematics and Mathematical Sciences",
  number="Article ID 67083",
  volume="2007",
  year="2008",
  month="january",
  pages="1--11",
  type="journal article - other"
}